On Thursday, December 6, 2012 at 12:47:53 PM UTC, Dima Pasechnik wrote:
>
> On 2012-12-06, Nicolas M. Thiery wrote:
> > On Thu, Dec 06, 2012 at 07:29:57AM +, Dima Pasechnik wrote:
> >> I wonder if one can actually work in the endomorphism ring/algebra of a
> >> CombinatorialFreeModule, an
On 2012-12-06, Nicolas M. Thiery wrote:
> On Thu, Dec 06, 2012 at 07:29:57AM +, Dima Pasechnik wrote:
>> I wonder if one can actually work in the endomorphism ring/algebra of a
>> CombinatorialFreeModule, and if yes, how.
>
> Not yet. I guess the closest approximation would be to take V \otime
I think that without some extra information this is bound to be difficult.
For the modules that I am working with at the moment I can do this and I am
in the process of making this more explicit.
The modules that I am working with have the following features which make
this tractable:
- the